0
Hi,
es geht um Folgendes:
![](data:image/png;base64,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)
Meine Antwort ist Null, weil dieser Spann keine Vektoren des R^3 erzeugt. Oder sehe ich da etwas falsch?
Laut Lösung wäre die Antwort 2. Das macht aber gar keinen Sinn.
es geht um Folgendes:
Meine Antwort ist Null, weil dieser Spann keine Vektoren des R^3 erzeugt. Oder sehe ich da etwas falsch?
Laut Lösung wäre die Antwort 2. Das macht aber gar keinen Sinn.
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Punkte: 12